Magnetic tunnel junction with anisotropy of perpendicular form and variability, memory point and logical element comprising the magnetic tunnel junction, method of manufacturing the magnetic tunnel junction

ABSTRACT

A magnetic tunnel junction with out-of-plane magnetisation includes a storage layer; a reference layer; a tunnel barrier layer, the two magnetisation states of the storage layer being separated by an energy barrier, the magnetic tunnel junction having a thermal stability factor dependent on the energy barrier and on the temperature of use of the magnetic tunnel junction. The storage layer has a thickness comprised between 0.5 times and 8 times a characteristic dimension of a planar section of the tunnel junction; the composition and the thickness of the storage layer are chosen such that the absolute value of the derivative of the thermal stability factor compared to a characteristic dimension of a planar section of the tunnel junction is less than 10 nm −1 .

CROSS-REFERENCE TO RELATED APPLICATIONS

This application claims priority to French Patent Application No. 1851603 filed Feb. 23, 2018, the entire content of which is incorporated herein by reference in its entirety.

TECHNICAL FIELD OF THE INVENTION

The present invention relates to a magnetic device including a variable magnetisation layer having a magnetic anisotropy perpendicular to the plane of the layers mainly induced by the shape of the variable magnetisation layer. The invention firstly relates to a magnetic tunnel junction. The invention secondly relates to a memory point including the magnetic tunnel junction. The point to point variability of the magnetic and electrical properties of the junctions is minimised by optimising the thickness and the magnetisation of the storage layer as a function of the size of the memory point. The invention thirdly relates to a non-volatile logic element including the magnetic tunnel junction. These devices notably find application in the spintronics field in particular for the realisation of magnetic random access memories (MRAMs) operating over a wide temperature range notably for automobiles, industrial applications, the space field but also for consumer electronics, high performance computing, the internet of things.

PRIOR ART

In order to meet recurrent needs to increase the density of memories for CMOS electronics, the size of devices continually decreases. However, the memories the most commonly used as working memories (“Dynamic Random Access Memories”, DRAMs and “Static Random Access Memories”, SRAMs) are volatile, that is to say that they have to be supplied continuously with voltage to retain the information. They have more and more energy consumption problems, notably in static mode, on account of an increased leakage current linked to their reduction in size. The FLASH memories used for the storage of data or codes are non-volatile, that is to say that they conserve their data in the absence of power supply, but have a writing endurance limited to at the most 100,000 cycles and their implementation in embedded version is complex, requiring 15 to 20 mask levels.

Different dense non-volatile memory technologies, with writing endurance and easier to integrate in CMOS technology than embedded FLASH memories, are under development. They are very interesting in order to reduce energy consumption. Among the different technologies of non-volatile memories (phase change memories, resistive oxide memories, ferroelectric memories, etc.), magnetic random access memories (MRAMs) combine a unique set of advantages: apart from their non-volatility, they are rapid in writing (˜20 ns), rapid in reading (several ns), may be produced in a dense manner (approaching the density of DRAMs), and have a much better writing endurance than that of FLASH memories (>10¹⁰ cycles for MRAMs compared to <10⁵ cycles for FLASHs). They are thus particularly interesting for being integrated in electronic circuits. This type of memory is based on magnetic tunnel junctions, formed by two ferromagnetic layers separated by an insulating oxide, generally of magnesium oxide MgO. The resistance of the device typically varies by a factor comprised between 3 and 4 according to whether the magnetisation of the two ferromagnetic layers is parallel or antiparallel, thereby providing a numerical “0” or “1”. In an electronic circuit, non-volatility makes it possible to reduce energy consumption by switching off the temporary inactive parts of the circuit and thus by eliminating the leakage current in these parts. New power gating strategies are thereby made possible. The concept of electronic computing in a circuit normally off with instant on (Normally-Off/Instant-On computing) has even been introduced to describe this approach (“Challenges toward gigabit-scale spin-transfer torque random access memory and beyond for normally off, green information technology infrastructure”, Takayuki Kawahara, J. Appl. Phys. 109, 07D325, 2011).

Different families of magnetic memories have been developed over the last 20 years. They essentially differ by the manner in which information is written in the memory points. Writing in a MRAM memory comes down to orienting the magnetisation of one of the magnetic electrodes of the tunnel junction (electrode called storage layer) parallel or antiparallel to the magnetisation of the second electrode of fixed magnetisation called reference layer. In the first family of MRAMs, the writing was done by magnetic field pulses. Commercially available products of the EVERSPIN™ Company called Toggle MRAM have used this writing method since 2006. However, the density of these memories is limited to several Mbits because the current required to produce magnetic field pulses (˜10 mA), does not make it possible to descend to technological nodes below 90 nm.

The second family of MRAMs that is attracting the most attention today is the family of MRAMs written by spin transfer torque (STT). They are known as STT-MRAMs. The phenomenon of spin transfer was predicted in 1996 by Slonczewski (Slonczewski, J. C., 1996, “Current driven excitations of magnetic multilayers,” J. Magn. Magn. Mater. 159, L1-L7) and Berger (Berger, L., 1996, “Emission of spin waves by a magnetic multilayer traversed by a current”, Phys. Rev. B 54, 4828-4830) and the possibility of using this phenomenon for switching the magnetisation of magnetic layers was demonstrated experimentally for the first time in 2000 (Katine, J. A., F. J. Albert, R. A. Buhrman, E. B. Myers, and D. C. Ralph, 2000, “Current-driven magnetization reversal and spin-wave excitations in Co/Cu/Co pillars,” Phys. Rev. Lett. 84, 3149-3152).

The use of spin transfer for writing in a magnetic tunnel junction provides a better configuration, in particular when the density is high, that is to say when the memory is of small size (typically less than 50 nm diameter).

Two parameters are very important for describing the performances of a STT-MRAM. The first is the thermal stability factor Δ=E_(b)/K_(B)T. In this expression, E_(b) represents the energy barrier separating the two stable states of the magnetisation of the storage layer, that is to say the energy barrier that has to be overcome to switch the magnetisation of the storage layer from parallel to antiparallel to that of the reference layer or vice versa from antiparallel to parallel depending on the value that it is wished to write in the memory point (“0” or “1”). This energy barrier is linked to the magnetic anisotropy of the storage layer. This parameter is very important because it determines the memory retention time, that is to say how long the memory manages to conserve the information that has been written before thermal fluctuations erase this information. It also makes it possible to estimate the error rate on standby or during reading as a function of time and the capacity of the memory. As is known to those skilled in the art, for memories of capacity of the order of 1 Gbit, thermal stability factors of the order of 80 are necessary, but the exact value of the Δ required depends on the error rate that can be tolerated (B. Dieny, L. Prejbeanu, chapter Magnetic Random Access Memory, in Introduction to Magnetic Random Access Memory, edited by B. Dieny, R. B. Goldfarb, K. J. Lee, IEEE Press, J. Wiley). The first STT-MRAMs that were developed have planar magnetisation, that is to say that the magnetisations of the storage layer and the reference layer are oriented on standby in the plane of the layers. The anisotropy of the storage layer is then the most often obtained by giving to the magnetic tunnel junction an elongated shape in the plane, in particular an elliptical shape characterised by a large axis typically 2 to 3 times greater than the small axis of the ellipse. At this moment, the magnetisation has a tendency to align itself with the large axis of the ellipse which constitutes the easy magnetisation axis, the small axis being à contrario the difficult magnetisation axis. The height of the energy barrier E_(b) to make the magnetisation of the storage layer pass from one direction to the opposite direction by coherent rotation is given by the following approximate expression (Apalkov, D., B. Dieny and J. M. Slaughter, Magnetoresistive Random Access Memory, Proceedings of the IEEE 104 (2016) 1796-1830):

E _(b)=μ₀π²(M _(s) L)² w(AR−1)

where μ₀ is the permittivity of a vacuum, M_(s) the magnetisation of the storage layer, L the thickness of the storage layer, w the width of the ellipse (dimension of the small axis), AR the aspect ratio of the ellipse that is to say the ratio of the length of the large axis divided by the length of the small axis. In these MRAMs with planar magnetisation, the aspect ratio is in general limited to 3 at the most because beyond this the reversal of the magnetisation no longer takes place by coherent rotation of the magnetisation but by nucleation and propagation of walls. The barrier height then no longer increases with the aspect ratio or even decreases for a given total surface area of the memory point.

More recently, as will be explained hereafter, the interest for STT-MRAMs has been concentrated on magnetic tunnel junctions with perpendicular magnetisation. This is due to two main reasons. On the one hand, anisotropies much stronger in perpendicular anisotropy than in planar anisotropy can be created, notably by playing on interfacial anisotropy phenomena. This makes it possible to reduce the size of the memory points while retaining a sufficient thermal stability factor. On the other hand, for a same given thermal stability factor, that is to say for a given retention time, it is known that the critical switching current is much lower for junctions with perpendicular magnetisation than for junctions with planar magnetisation. This will be explained in greater detail hereafter.

STT-MRAMs of the prior art are based on a phenomenon of perpendicular anisotropy at the magnetic metal/oxide interfaces (U.S. Pat. No. 8,247,093 (B2), U.S. Pat. No. 8,513,944 (B2)). This phenomenon has been observed with different oxides (AlOx, MgO, TaOx, CrOx) and different magnetic materials (Co, Fe and alloys) but is particularly interesting in the context of STT-MRAMs at CoFeB/MgO interfaces (Ikeda, S., K. Miura, H. Yamamoto, K. Mizunuma, H. D. Gan, M. Endo, S. Kanai, J. Hayakawa, F. Matsukura, and H. Ohno, 2010, “A perpendicular-anisotropy CoFeB—MgO magnetic tunnel junction,” Nature Mater. 9, 721-724). This interfacial anisotropy is often noted Ks. It is an energy per surface unit that may be of the order of 1 to 2 mJ/m² at the CoFeB/MgO interface. It has been shown that this anisotropy is higher at the Fe/MgO interface than it is at the Co/MgO interface (Yang, H. X., M. Chshiev, B. Dieny, J. H. Lee, A. Manchon, and K. H. Shin, 2011, “First principles investigation of the very large perpendicular magnetic anisotropy at Fe|MgO and Co|MgO interfaces,” Phys. Rev. B 84, 054401). This interfacial perpendicular anisotropy suffices in conventional STT-MRAMs to draw the magnetisation of the storage layer out-of-plane by exceeding the shape anisotropy which rather has a tendency to bring back the magnetisation in-plane in so far as the thickness of the storage layer is much less than its diameter in STT-MRAMs of the prior art. Thus a tunnel junction of the prior art with perpendicular anisotropy is described in FIG. 1A. It includes in general a reference layer of fixed magnetisation generally constituted of a synthetic antiferromagnetic (SAF) well known to those skilled in the art, a tunnel barrier made of MgO, a storage layer made of alloy based on Co, Fe and B, and a non-magnetic metal protective layer, often made of tantalum or tungsten or molybdenum.

In order to further increase the interfacial anisotropy of the storage layer, it has also been proposed to insert the storage layer between two oxide barriers as described in FIG. 1B. This makes it possible to benefit from the two interfaces between one and the other of the oxide barriers and the magnetic storage layer (U.S. Pat. No. 8,247,093 (B2); U.S. Pat. No. 8,513,944 (B2); Sato, H., T. Yamamoto, M. Yamanouchi, S. Ikeda, S. Fukami, K. Kinoshita, F. Matsukura, N. Kasai, and H. Ohno, 2014, “Comprehensive study of CoFeB—MgO magnetic tunnel junction characteristics with single- and double-interface scaling down to 1×nm,” in Proceedings of the International Electron Devices Meeting (IEDM), San Francisco, 33.2.1-33.2.4).

In tunnel junctions with perpendicular magnetisation in which the storage layer generally has a flattened cylinder shape (that is to say having a thickness much less than the diameter), the energy barrier separating the two magnetisation states of the storage layer (“upwards” magnetisation or “downwards” magnetisation) is given by:

$E_{b} = {A\left\lbrack {K_{s\; 1} + K_{s\; 2} - {\frac{\mu_{0}}{2}\left( {N_{xx} - N_{zz}} \right)M_{s}^{2}L} + {K_{u}L}} \right\rbrack}$

In this expression, A represents the surface (area) of the storage layer, K_(s1) and K_(s2) represent the interfacial anisotropies at the two lower and upper interfaces of the storage layer, N_(xx) and N_(zz) are demagnetising field coefficients along the direction x in-plane and z out-of-plane, μ₀, M_(s) and t have been defined previously, K_(u) is a potential volume anisotropy for example of magnetocrystalline or magnetoelastic origin. In general, this energy is negligible compared to the other contributions to the anisotropy for the materials commonly used in STT-MRAMs. As regards N_(xx) and N_(zz), as long as the thickness of the layer is much less than its diameter, this gives N_(xx)˜0 and N_(zz)˜1. When the thickness is no longer much less than the lateral dimension, an approximate expression of N_(xx)−N_(zz) is (M. Sato and Y. Ishii, J. Appl. Phys. 60, 983 (1989)):

${{N_{xx} - N_{zz}} = {\frac{1}{2}\left( {1 - \frac{3}{1 + {2f\mspace{14mu} {AR}}}} \right)}},$

where f=1 in the case of a rectangular parallelepiped with square base and

$f = \frac{2}{\sqrt{\pi}}$

in the case of a cylinder with circular base. This approximate expression is useful for developing an analytical calculation but more precise values are given in the following publication: Du-Xing Chen, James A. Brug, Member, IEEE, and Ronald B. Goldfarb, Demagnetizing Factors for Cylinders, IEEE Trans. Mag. 4, 3601 (1991) or in the following for cylinders with elliptical section: M. Beleggia, M. De Graef, Y. T. Millev, D. A. Goode and G. Rowlands, Demagnetization factors for elliptic cylinders, J. Phys. D: Appl. Phys. 38 (2005) 3333.

It should be recalled that by convention, in magnetism, when an anisotropy is positive, it tends to orient the magnetisation out-of-plane of the layer. Conversely, when the anisotropy is negative, it ends to orient the magnetisation in-plane. In STT-MRAMs with perpendicular anisotropy of the prior art, the interfacial anisotropy term A(K_(s1)+K_(s2)) is positive whereas the term

$- {A\left\lbrack {\frac{\mu_{0}}{2}\left( {N_{xx} - N_{zz}} \right)M_{s}^{2}L} \right\rbrack}$

linked to the shape anisotropy of the storage layer is negative such that the two terms are in competition. This is problematic in STT-MRAMs of the prior art because it prevents increasing the thickness t of the storage layer. Indeed, by increasing this thickness, the relative weight of the planar shape anisotropy is increased compared to the perpendicular interfacial anisotropy which reduces the total effective anisotropy. It is for this reason that in conventional perpendicular STT-MRAMs, the thickness of the storage layer is limited to values of the order of 1.4 nm for junctions with single tunnel barrier and around 2 nm for junctions with double barrier.

Another problem of MRAM memories of the prior art with out-of-plane magnetisation is that the barrier height is proportional to the surface area of the tunnel junction. The more that smaller and smaller technological nodes are approached, the more this surface area A decreases. Consequently E_(b) decreases and there is always a diameter threshold below which the thermal stability factor becomes too small to ensure a sufficient retention and thus a sufficiently low error rate in the conservation of data written in the memory. Typically, with memories of the prior art, the critical diameter below which the height of the energy barrier becomes too low at 85° C. is situated at around 25 nm.

A second very important parameter for characterising a memory point STT-MRAM is its writing current I_(c0). It is known by those skilled in the art that the writing current in a STT-MRAM depends on the duration of the writing current pulses. In the so-called thermally activated regime observed for pulses of duration typically above 10 ns, the writing current varies as:

$I_{c} = {I_{c\; 0}\left\{ {1 - {\frac{k_{B}T}{E_{b}}{{Ln}\left( \frac{\tau}{\tau_{0}} \right)}}} \right\}}$

where τ is the pulse duration and τ₀ a characteristic test time of the order of 1 ns. The writing current thus varies linearly as a function of the logarithm of the duration of the pulses. I_(c0) corresponds to the extrapolation of this linear behaviour for a pulse duration of 1 ns.

I_(c0) is a very important parameter because it determines the size of the selection transistor connected to the tunnel junction. For a given resistance of the memory point, which is in general adjusted to be of the order of magnitude as that of the transistor in ON mode, this writing current is going to determine the writing voltage. The resistance*area (RA) product of the tunnel junction is in general adjusted by playing on the thickness of the tunnel barrier so that this voltage is situated around 0.3 to 0.5V, sufficiently low compared to the dielectric breakdown voltage of the tunnel barrier (˜1.2 to 1.6V) to ensure quasi-unlimited writing endurance of the memory point. Furthermore, the writing current has an influence on the electrical consumption that it is sought to minimise most of the time especially for nomad applications or devices of the internet of things.

From a theoretical viewpoint, the writing current is given by the following expressions (Sun, J. Z, 2000, “Spin-current interaction with a monodomain magnetic body: A model study,” Phys. Rev. B 62, 570-578.):

-   -   For STT-MRAMs with planar magnetisation:

$I_{c}^{0} = {{Aj}_{c}^{0} = {\frac{A}{\eta}\frac{2\alpha \; e\; \mu_{0}}{\overset{\_}{h}}\left( {M_{s}L} \right)\left( {\frac{H_{\bot}^{eff}}{2} + H_{K}} \right)}}$

in which A is the area of the junction, j_(c) ⁰ is the critical current density for writing, η is the efficiency of the spin transfer torque linked to the spin polarisation of the current injected into the storage layer at the moment of writing (typically ˜80% for MgO barriers of the prior art), h is the reduced Planck's constant, e the absolute value of the charge of the electron, α is the Gilbert dampening of the constituent material of the storage layer, M_(s) its magnetisation, L the thickness of the storage layer, e the charge of the electron, μ₀ the permittivity of a vacuum, H_(⊥) ^(eff) the effective demagnetising field felt by the magnetisation of the storage layer if it points out-of-plane, this field being given by

${\mu_{0}H_{\bot}^{eff}} = {{\mu_{0}M_{s}} - {2\left( {\frac{K_{s}}{L} + K_{u}} \right)}}$

and H_(K) is the planar anisotropy field which defines the memory retention, H_(K) being given by μ₀M_(s)H_(K)=E_(b)=μ₀π²(M_(s)L)²w(AR−1). As is known by those skilled in the art, in the case of magnetic tunnel junctions, the energy barrier to overcome to switch the magnetisation by STT (proportional to

$\left. \left( {\frac{H_{\bot}^{eff}}{2} + H_{K}} \right) \right)$

is much higher than that which determines the memory retention (proportional to (H_(K))). This is unfavourable because it signifies that, for a given memory retention, it is necessary to provide more current to overcome the higher barrier associated with the switching than necessary by virtue of the memory retention. This additional cost in current during switching comes from the fact that in its dynamic of switching by STT, the magnetisation is forced to come out-of-plane of the layer, which costs a lot of additional energy.

-   -   For STT-MRAMs with perpendicular magnetisation:

$I_{c}^{0} = {{Aj}_{c}^{0} = {\frac{A}{\eta}\frac{2\alpha \; e\; \mu_{0}}{\overset{\_}{h}}\left( {M_{s}L} \right)\left( H_{K}^{eff} \right)}}$

where the notations are the same as above and H_(K) ^(eff) represents the effective perpendicular anisotropy field felt by the magnetisation of the storage layer given by:

${\mu_{0}H_{K}^{eff}} = {{{\mu_{0}\left( {N_{xx} - N_{zz}} \right)}M_{s}} + {\frac{2}{M_{s}}\left( {\frac{K_{s\; 1} + K_{s\; 2}}{L} + K_{u}} \right)}}$

In STT-MRAMs of the prior art, this effective perpendicular anisotropy field is essentially due to the interfacial anisotropy at the interfaces between the storage layer and the two adjacent layers which are, usually, two MgO oxide layers. This anisotropy field is reduced by the demagnetising field expressed by the term μ₀(N_(xx)−N_(zz))M_(s) opposite to the anisotropy field term linked to the interfaces. The term in K_(u) corresponds to the potential existence of a volume anisotropy of magnetocrystalline or magnetoelastic origin, in general negligible.

By combining the above two expressions with that given previously for the barrier height E_(b) in perpendicular anisotropy, the following relationship may be deduced:

$I_{c}^{0} = {\left( \frac{4e}{\overset{\_}{h}} \right)\frac{\alpha \; E_{b}}{\eta}}$

This relationship, valid from the moment that the magnetisation behaves in a macrospin manner, that is to say like a uniform magnetisation block, shows that the writing current is directly proportional to the barrier E_(b) that determines the memory retention. This is much more favourable than for planar tunnel junctions for which an additional cost in writing current was necessary to achieve switching of the magnetisation of the storage layer. This explains the greater interest of tunnel junctions with out-of-plane magnetisation for STT-MRAMs compared to junctions with planar magnetisation. However, in the prior art, it is known that the Gilbert dampening a increases for very thin layers due to spin pumping phenomena (Ikeda, S., K. Miura, H. Yamamoto, K. Mizunuma, H. D. Gan, M. Endo, S. Kanai, J. Hayakawa, F. Matsukura, and H. Ohno, 2010, “A perpendicular-anisotropy CoFeB—MgO magnetic tunnel junction,” Nature Mater. 9, 721-724). This increases as much as the writing current which is proportional thereto.

To summarise, the magnetic tunnel junctions of the prior art and the memory points that they use do not make it possible to:

-   -   Manage to conserve a sufficiently large thermal stability factor         in tunnel junctions of which the diameter corresponds to the         most advanced technological nodes (from 40 nm to 4 nm), and thus         to ensure a sufficiently long retention in these tunnel         junctions;     -   Minimise the writing current;     -   Reduce the variations of anisotropy and writing current over a         wide operating temperature range, for example −40° C. to         +150° C. for automobile applications.

GENERAL DESCRIPTION OF THE INVENTION

To resolve at least partially these technical problems, the present invention relates to a magnetic tunnel junction with out-of-plane magnetisation including:

-   -   a storage layer having a magnetisation switchable between two         magnetisation states normal to the plane of the layer;     -   a reference layer having a fixed magnetisation and normal to the         plane of the layer;     -   a tunnel barrier layer separating the storage layer and the         reference layer;     -   the two magnetisation states of the storage layer being         separated by an energy barrier, said magnetic tunnel junction         having a thermal stability factor dependent on the energy         barrier and on the temperature of use of the magnetic tunnel         junction, said magnetic tunnel junction being characterised in         that:     -   the storage layer has a thickness comprised between 0.5 times         and 8 times a characteristic dimension of a planar section of         the tunnel junction;     -   the composition and the thickness of the storage layer are         chosen such that the absolute value of the derivative of the         thermal stability factor compared to a characteristic dimension         of a planar section of the tunnel junction is less than 10 nm⁻¹,         the derivative of the thermal stability factor being calculated         at a temperature T_(m), the temperature T_(m) being the average         temperature of use of the magnetic tunnel junction.

Energy barrier separating the two magnetisation states of the storage layer is taken to mean the energy difference between the minimum energy corresponding to the initial stable state of the magnetisation of the storage layer and the maximum energy encountered during the reversal of the magnetisation to its final stable state.

Thermal stability factor is taken to mean a measurement of the stability of the magnetisation of the storage layer for a given energy barrier and temperature.

For example, the thermal stability factor may be expressed as Δ=E_(b)/K_(B)T, E_(b) being the energy barrier, T the temperature and K_(B) Boltzmann's constant.

Planar section of the tunnel junction is taken to mean a section of the tunnel junction along the plane of the layers forming the tunnel junction.

Characteristic dimension of a planar section is taken to mean a dimension of said planar section. For example, in the case of a tunnel junction having a circular section, the characteristic dimension of a planar section of the tunnel junction may be chosen as being the diameter of the circle. In the case of an elliptical section, the characteristic dimension may be chosen as being the small axis or the large axis of the ellipse.

“Characteristic dimension of a planar section” and “characteristic planar dimension” are hereafter synonymous.

Choice of the composition of the storage layer is taken to mean the choice of at least one of the materials comprised in the storage layer.

If the tunnel junction is used at a temperature comprised between the temperatures T₁ and T₂, the average temperature of use T_(m) is defined as T_(m)=(T₁+T₂)/2.

For example, in the case of an automobile application for which the memory has to operate between −40° C. and +150° C., T_(m) is equal to 55° C. i.e. 328K.

Thickness of the storage layer is taken to mean the size of the storage layer measured along a direction normal to the plane of the layers.

Advantageously, the magnetic tunnel junction according to the invention makes it possible to increase the thickness of the storage layer. Indeed, a thicker storage layer has fewer thermal fluctuations at the operating temperature and suffers less from potential problems of interdiffusion than storage layers of the prior art. Thanks to the invention, a higher magnetoresistance magnitude and a lower dependency of the magnetic and transport properties over the operating temperature ranges is obtained. In particular, the magnetic tunnel junction is particularly suited to applications in the consumer electronics field (temperature range comprised between 0° C. and 85° C.) and in the automobile field (temperature range comprised between −40° C. and 150° C.).

Advantageously, the increase in the thickness of the storage layer enables the use of materials and of thicknesses having a lower Gilbert dampening and thus the minimisation of the writing current.

The principle of the invention may be explained in the following manner.

In the prior art, STT-MRAMs have always used very thin storage layers of which the thickness is much less than the diameter. This was motivated in particular by the fact that spin transfer being an interfacial phenomenon (taking place typically over the first nanometre from the interface through which the spin polarised current is injected), it is preferable to use very thin layers so as not to dilute the efficiency of the spin transfer torque. For such very thin layers, the shape anisotropy favours an in-plane orientation of the magnetisation of the storage layer and thus opposes the interfacial anisotropy which, for its part, favours a perpendicular orientation of this magnetisation. This leads to an effective anisotropy of relatively average amplitude resulting from the competition of these two anisotropy terms.

The present invention proposes completely changing paradigm by using a much thicker storage layer that is to say of which the thickness is at least half of a characteristic planar dimension of the storage layer. Characteristic planar dimension is taken to mean for example diameter for a memory point of cylindrical shape with round base, length of the small axis for a cylindrical memory point of elliptical base or width for a memory point of square base, small size of a memory point of quasi-rectangular shape, etc., as represented in FIGS. 2a -2 c.

Thus the shape anisotropy is considerably reduced or even also favours an out-of-plane orientation of the magnetisation. In this case, the shape anisotropy and the interface anisotropy can be added together, for both to favour an orientation perpendicular to the plane of the layers of the magnetisation of the storage layer.

Memories using this vertical shape anisotropy will be designated PSA-MRAMs for Perpendicular Shape Anisotropy-MRAMs.

Hereafter reference will be made to memories having a cylindrical shape but those skilled in the art will understand that the present patent may be easily adapted to the case where the tunnel junction and in particular the storage layer would have a slightly pyramidal shape (illustrated in FIG. 2c ) notably due to the etching process when ion beam etching (IBE) is used. Indeed, it is known that if the etching is carried out by ion beam etching (IBE), the sides of the pillar may be slightly tapered on account of shading effects. The shape anisotropy can find itself quantitatively modified but the spirit of the patent remains the same.

To clearly understand the idea, the most common case of a tunnel junction of which the storage layer has a quasi-cylindrical shape is used here. In this case and assuming that the storage layer is constituted of a single magnetisation material M_(s), the energy barrier separating the two “upwards” and “downwards” magnetisation states can be expressed in an approximate manner by:

$E_{b} \approx {A\left\lbrack {K_{s\; 1} + K_{s\; 2} - {\frac{\mu_{0}}{4}\left( {1 - \frac{3}{1 + {4{AR}\text{/}\sqrt{\pi}}}} \right)M_{s}^{2}L} + {K_{u}L}} \right\rbrack}$

This expression shows that from the moment that the aspect ratio of the storage layer exceeds

${AR} = {\frac{\sqrt{\pi}}{2} \approx 0.89}$

then the shape anisotropy term

${- \frac{\mu_{0}}{4}}\left( {1 - \frac{3}{1 + {4{AR}\text{/}\sqrt{\pi}}}} \right)M_{s}^{2}L$

changes sign to pass from negative to positive. In other words, for a thickness/diameter aspect ratio greater than ˜0.89, the shape anisotropy as added to the perpendicular interface anisotropy present at the tunnel barrier/storage layer interface.

This is illustrated in FIG. 3 which represents the thermal stability factor Δ in colour code as a function of the diameter of the storage layer and its thickness. The parameters chosen to establish this diagram correspond to a cobalt storage layer. STT-MRAMs of the prior art, or p-STT-MRAMs, are located in the bottom right hand corner of this diagram. As discussed previously, in this situation of the prior art, the effective anisotropy and thus the thermal stability factor decreases if the thickness of the layer increases. For a minimum thickness of the storage layer of the order of 1.5 nm to have a sufficient tunnel magnetoresistance, the diagram shows that it is not possible to descend below a diameter of the order of 20 nm while retaining a thermal stability factor greater than 60.

On the other hand, if one passes into the regime exploited by the present invention where the thickness of the storage layer becomes much greater (upper part of the diagram) then very high values of the thermal stability factor (A>60) may be obtained and this is so up to diameters of the order of 4 nm.

The diagram shows the macrospin approximation limit line. Below this limit, it may be considered that the magnetisation of the storage layer reverses in a coherent manner whereas, above this line, the reversal of the magnetisation is rather going to take place with an important deformation of the magnetisation being able to include the nucleation of a reverse domain and the propagation of the magnetic wall separating this reverse domain from the remainder of the layer.

As long as one remains in the region where the macrospin approximation is valid, the relationship

$I_{c}^{0} = {{\left( \frac{4e}{\overset{\_}{h}} \right)\frac{\alpha \; E_{b}}{\eta}} = {\left( \frac{4e}{\overset{\_}{h}} \right)\frac{\alpha \; k_{B}T\; \Delta}{\eta}}}$

remains valid.

This shows a counterintuitive result: even though the thickness of the storage layer is considerably increased compared to STT-MRAMs of the prior art, the writing current will not be increased as long as one remains within the same range of values of the thermal stability factor Δ required by the applications, that is to say typically Δ between 60 and 100 depending on the capacity of the memory and the acceptable error rate.

Conversely, the fact of increasing the thickness of the storage layer has several advantages:

-   -   A thick layer has magnetic properties much closer to the bulk         material than a very thin layer such as the storage layer(s)         normally used in p-STT-MRAMs of the prior art (layers of 1.5 nm         to 2 nm thickness). In particular, thermal fluctuations develop         less quickly as a function of temperature than in a very thin         layer. Indeed, it is known that due to the reduced number of         neighbouring atoms on the surface of a magnetic layer, the         temperature of magnetic order tends to decrease in the         ferromagnetic layers of several atomic planes thickness. This         means that thermal fluctuations develop in a more important         manner in very thin layers than in bulk materials of same         composition. In the context of p-STT-MRAMs of the prior art,         this results in a rapid decrease in the tunnel magnetoresistance         and the magnetic anisotropy as a function of temperature, which         is bothersome if the device has to operate over wide temperature         ranges (−40° C. to +150° C. for automobiles) or must manage to         retain the memory during a soldering operation being able to         lead to a rise in temperature to 260° C. for one minute (solder         reflow compliance). Thus, since the writing current is         proportional to E_(b), the strong variation of anisotropy over         the operating range of conventional STT-MRAMs leads to a low         retention at the upper limit of the operating range and to a         strong writing current at the lower limit of the operating         range. Thanks to the use of thick magnetic layers as proposed in         the present invention, this thermal variation, which resembles         much more that of the bulk material, is greatly reduced. Thus,         as an example, bulk cobalt only sees its magnetisation vary by         several % (5 to 7%) between −40° C. and 150° C. whereas in         layers of 1.5 nm thickness, this variation may be from 30 to         40%.     -   A second advantage relates to the Gilbert dampening that         intervenes directly in the writing current. As long as one         remains in the macrospin regime, the Gilbert dampening a that         appears in the expression of the writing current is the Gilbert         dampening averaged over the whole volume of the storage layer.         Optimisations are then possible to obtain a strong tunnel         magnetoresistance and a low average dampening as explained         below.

Furthermore, an important point of the present invention relates to the optimisation of the choice of the thickness and the magnetic parameters of the storage layer to minimise the effects of dispersion of properties from memory point to memory point during the manufacture of a memory chip. Among the following parameters: diameter, thickness, magnetisation at saturation, interface anisotropy and volume anisotropy, mainly the diameter is likely to vary significantly from memory point to memory point due to the method of etching or nanostructuring the memory points. Indeed, all the other parameters are chosen upstream of the etching of the junctions and are not affected by the latter. The deposition techniques of those skilled in the art are perfectly mastered and do not induce significant spatial variations of its properties within a chip. On the other hand, during the etching of the tunnel junctions, it is inevitable that variations of diameter appear from one junction to the next. These variations of diameter may typically be of the order of from 1 to several nanometres. Since in the present invention the total effective anisotropy mainly or entirely draws its source from the shape anisotropy term, that is to say linked to the very shape of the storage layer, it is inevitable that variations of diameter induce variations of thermal stability, and consequently variations of writing current. In order to minimise the effect of diameter variations on the stability, it is necessary to be positioned at the point defined by min (|∂Δ/∂D|) where min(*) represents the minimum function and |*| the absolute function value. In particular, when this is possible, it is advantageous to be positioned at the point defined by.

$\frac{\partial\Delta}{\partial D} = 0.$

The device according to the invention may also have one or more of the characteristics below, considered individually or according to all technically possible combinations thereof:

-   -   the planar section of the magnetic tunnel junction according to         the invention is circular or quasi-circular and said         characteristic dimension is the diameter of the section;     -   the diameter of the magnetic tunnel junction is less than 50 nm;     -   the storage layer is constituted of a homogeneous magnetic         material;     -   the storage layer includes an assembly of magnetic and         non-magnetic layers;     -   the storage layer includes at least one magnetic layer         containing an amorphising element such as boron and one or more         layers able to absorb the amorphising element during         post-deposition annealing;     -   the storage layer includes at least two magnetic materials, of         which a first material close to the tunnel barrier is able to         provide a strong tunnel magnetoresistance and a second material         has a low Gilbert dampening;     -   the tunnel barrier is made of MgO, AlOx, AlN, SrTiO₃, HfOx or         any other insulating oxide or nitride;     -   the storage layer is constituted of the stack of different         layers including:         -   a layer made of alloy of cobalt, iron and boron of thickness             between 1 and 4 nm in contact with the tunnel barrier;         -   a layer of a material, able to absorb boron such as Ta, Mo             or W at the moment of post-deposition annealings, of 0.2 to             0.4 nm thickness,         -   a magnetic layer with low Gilbert dampening;     -   the storage layer is inserted between two tunnel barriers;     -   the magnetic tunnel junction according to the invention         advantageously has the following properties:         -   the storage layer has a thickness comprised between 0.8 and             8 times a characteristic dimension of a planar section of             the tunnel junction;         -   the contribution to the energy barrier due to the shape             anisotropy of the storage layer is at least two times             greater and preferably at least four times greater than the             contributions to the energy barrier of interfacial origin;     -   the storage layer includes one or more magnetic materials having         a Curie temperature above 400° C. and preferably above 600° C.         and preferably above 800° C.;     -   the storage layer includes an alloy including cobalt and/or iron         and an amorphising element such as boron, said alloy being in         contact with the tunnel barrier;     -   the storage layer contains one or more layers of materials such         as Ta, W, Mo, Hf, able to absorb the amorphising element present         in the storage layer and to ensure structural transitions         between the different magnetic materials comprised in the         storage layer.

The invention also relates to the use of a magnetic tunnel junction according to the invention in a MRAM cell with spin transfer or STT-MRAM or memory point of STT-MRAM type including a magnetic tunnel junction according to the invention.

The invention also relates to the use of a magnetic tunnel junction according to the invention in a MRAM cell with spin orbit torque or SOT-MRAM or memory point of SOT-MRAM type including a magnetic tunnel junction according to the invention.

The invention also relates to the use of a magnetic tunnel junction according to the invention in a MRAM cell with voltage controlled writing of the magnetic properties of the storage layer or VC-MRAM for Voltage Controlled MRAM. In other words, a MRAM memory point with voltage controlled writing including a magnetic tunnel junction according to the invention.

The application also describes the use of a magnetic tunnel junction according to the invention in a non-volatile cell integrated in a non-volatile logic component.

The present invention also relates to a method for manufacturing a magnetic tunnel junction in which the thick storage layer is etched by reactive ion etching, this storage layer then serving as hard mask for the etching of the remainder of the tunnel junction by ion etching.

BRIEF DESCRIPTION OF THE FIGURES

Other characteristics and advantages of the invention will become clear from the description that is given thereof below, for indicative purposes and in no way limiting, with reference to the appended figures, among which:

FIG. 1A: Schematic representation of a p-STT-MRAM stack belonging to the prior art with single MgO barrier and a non-magnetic upper electrode;

FIG. 1B: Schematic representation of a p-STT-MRAM stack belonging to the prior art with double MgO barrier and a non-magnetic upper electrode;

FIGS. 2A-2C: Schematic representations of three examples of a magnetic tunnel junction PSA-STT-MRAM according to the invention;

FIG. 3: Thermal stability factor (in grey levels) as a function of the diameter and the thickness of the storage layer;

FIG. 4: Schematic representation of the magnetic tunnel junction according to a first embodiment PSA-MRAM-1;

FIG. 5: Schematic representation of the magnetic tunnel junction according to a second embodiment PSA-MRAM-2;

FIG. 6: Representation of A as a function of the diameter for all M_(S) (grey levels) and for different thicknesses L. Diagram calculated from the macrospin model for a cylinder with K_(S)=0 J/m² and K_(u)=0 J/m³;

FIG. 7A: Graphs of M_(S) ^(FM opti) and t^(FM opti) calculated for a magnetocrystalline anisotropy of K_(u) ^(FM)=0. These curves correspond to the monolayer stack FM, for a stability Δ₃₀₀=60;

FIG. 7B: Identical to FIG. 7A with the sole exception that the magnetocrystalline anisotropy is equal to K_(u) ^(FM)=0.3 10⁶ J/m³;

FIG. 7C: Graphs of M_(S) ^(FM opti) and t^(FM opti) calculated for a magnetocrystalline anisotropy of K_(u) ^(FM)=0. These curves correspond to the stack FeCoB/FM with M_(S) ^(FeCoB)=1.0 10⁶ A/m, t^(FeCoB)=1.4 nm and K_(S) ^(FeCoB)=1.4 mJ/m², for a stability Δ₃₀₀=60;

FIG. 7D: Identical to FIG. 7C with the sole exception that the magnetocrystalline anisotropy is equal to K_(u) ^(FM)=0.3 10⁶ J/m³;

FIG. 8: Graphs representing in colour code the variability of the thermal stability factor (and thus also the writing current) as a function of the diameter of the cell for two given variabilities of the diameter of the cell (variability associated with the etching method: δD=1 nm left column, δD=2 nm, right column). In these figures, 3 parameters have been varied Δ, K_(s) and K_(u). The vertical scales each represent one of these parameters, the two others being fixed. For each set of values of parameters Δ, K_(s) and K_(u), D, the thickness L and the magnetisation M_(S) are chosen to correspond to the optimal parameters {L^(opti), M_(S) ^(opti)};

FIG. 9: Method for manufacturing a tunnel junction according to the invention;

FIGS. 10A-10B: Implementation of the junction according to the invention in a SOT-MRAM memory cell; 10A “Top” configuration; 10B “Bottom” configuration;

FIG. 11: Implementation of the junction according to the invention in a voltage controlled MRAM (VC-MRAM). The bottom configuration is also possible;

FIG. 12: Example of non-volatile logic component using tunnel junctions according to the invention, here a non-volatile latch;

FIG. 13: Temperature evolution of the thermal stability factor of p-STT-MRAMs according to the prior art with out-of-plane magnetisation for tunnel junctions of diameter between 100 nm and 44 nm;

FIG. 14: Temperature dependency of the interfacial anisotropy of first order (uniaxial in sin² θ, θ angle between the magnetisation of the storage layer and the normal to the plane of the layers) and of second order (in sin⁴ θ) of W/CoFeB/MgO multilayers with different thicknesses of CoFeB. Taken from Kyoung-Min Lee et al., “Temperature dependence of the interfacial magnetic anisotropy in W/CoFeB/MgO”, AIP Advances 7, 065107 (2017).

FIG. 15: Thermal variation of the magnetisation of bulk cobalt.

DETAILED DESCRIPTION OF THE INVENTION

Unless stated otherwise, a same element appearing in the different figures has a single reference.

FIGS. 2A-2C schematically represent three examples of magnetic tunnel junction PSA-STT-MRAM according to the invention.

According to alternative a), the tunnel junction according to the invention includes a reference layer of fixed out-of-plane magnetisation RL, a tunnel barrier TB and a storage layer SL having a vertical thickness/(characteristic planar dimension) aspect ratio comprised between 0.5 and 8. The reference layer RL has a fixed perpendicular magnetisation represented by a single arrow. The storage layer has a perpendicular magnetisation switchable between two magnetisation states normal to the plane of the layers, represented by a double arrow. In the so-called “top” configuration a), the storage layer SL is above the tunnel barrier TB and the reference layer RL below. In the so-called “bottom” configuration b), the storage layer is below the tunnel barrier TB and the reference layer RL above. For reasons of quality of growth and ease of manufacture, configuration a) is preferable in so far as possible.

The configuration of FIG. 2C also represents a tunnel junction according to the invention in which the sides of the junction are slightly tapered instead of being virtually vertical. This shape with tapered sides may come from the etching of the junction by ion beam etching (IBE). Even if quantitatively the shape anisotropy of the storage layer SL is modified on account of this truncated cone shape, a vertical shape anisotropy may also be obtained and the other parameters may be adapted to this shape by those skilled in the art according to the present invention.

For example, the reference layer RL may include a CoFeB alloy with a thickness comprised between 1 and 3 nm. The tunnel barrier layer TB may include MgO with a thickness comprised between 0.6 and 2 nm.

FIG. 3 shows a diagram of the thermal stability factor Δ in colour code as a function of the diameter of the storage layer and its thickness.

The parameters chosen to establish this diagram are representative of an interfacial layer of FeCoB (up to 1.4 nm of thickness) completed by a layer of cobalt.

The upper part of the diagram corresponds to a tunnel junction according to the invention PSA-STT-MRAM with a thick Co storage layer.

The lower part of the diagram corresponds to a magnetic tunnel junction p-STT-MRAM according to the prior art.

The interpretation of this diagram for the understanding of the invention has been given above.

FIG. 4 describes a first particular embodiment of a magnetic tunnel junction according to the invention or PSA-MRAM-1 in which the storage layer SL is composed of a single ferromagnetic layer FM that is to say constituted of a single homogeneous material.

The tunnel junction illustrated in FIG. 4 includes from bottom to top:

-   -   a lower electrical contact layer T1;     -   a metal growth layer M;     -   a synthetic antiferromagnetic element SAF constituted of two         ferromagnetic layers antiferromagnetically coupled through a         coupling layer RKKY for example of Ru of 0.3 nm to 0.8 nm         thickness;     -   a structural transition layer TS able to absorb boron, for         example made of Ta or W;     -   a reference layer RL typically made of CoFeB of 1 to 3 nm         thickness;     -   a tunnel barrier TB usually made of MgO of thickness between 0.6         and 2 nm;     -   the storage layer SL having a vertically elongated aspect ratio,         the storage layer being formed of a layer FM including a         homogenous material giving a strong tunnel magnetoresistance and         preferably with low Gilbert dampening such as an alloy based on         Co, Fe and B.

This layer FM is surmounted by a metal layer T₂ making it possible to absorb the amorphising element (here B) and also serving as upper electrical contact and potentially as hard mask during the etching of the memory point.

The symmetrical “bottom” configuration is also possible.

Starting from its base, the tunnel junction PSA-MRAM-1 according to the invention includes on a substrate T1 a seed and growth layer M intended to favour the adherence of the tunnel junction on its substrate and to promote a good growth texture for the remainder of the junction. It next includes a synthetic antiferromagnetic layer SAF well known to those skilled in the art, constituted of two ferromagnetic layers of which the magnetisations are coupled in an antiparallel manner through a thin layer RKKY ensuring an antiparallel coupling between the magnetisations of the ferromagnetic layers. This coupling layer is constituted of a material such as ruthenium or iridium of suitably chosen thickness so that the coupling is antiparallel. For example, for ruthenium, the thicknesses giving antiparallel coupling are typically between 0.3 nm and 0.8 nm. The ferromagnetic layers are constituted of multilayers such as (Co/Pt) or (Co/Pd) or of CoPt or CoPd alloys or of L10 ordered alloys of FePt or FePd type known to have out-of-plane magnetic anisotropy. This synthetic antiferromagnetic multilayer SAF is surmounted by a thin nanocrystalline metal layer TS typically made of Ta, W or Mo having several aims:

-   -   to ensure a structural transition between the synthetic         antiferromagnetic multilayer generally of face centred cubic         (fcc) structure of third order symmetry in the favoured growth         direction (111) and the layer of CoFeB alloy in contact with the         tunnel barrier which is of cubic centred structure thus of         fourth order symmetry;     -   to absorb boron or the amorphising element if said element is         other than boron (for example Zr, Nb, etc.) outside of the CoFeB         layer in contact with the MgO tunnel barrier during the         post-deposition annealing necessary for the good crystallisation         of the MgO barrier and its electrodes. This layer is         sufficiently thin (typically between 0.2 nm and 0.4 nm) to         provide strong ferromagnetic coupling between the synthetic         antiferromagnetic multilayer and the CoFeB layer.

This structural transition layer TS is itself surmounted by a layer of CoFeB alloy of thickness typically between 1 and 2 nm which constitutes the reference electrode RL of the tunnel junction. The magnetisation of this layer remains fixed out-of-plane during the operation of the memory.

This layer is surmounted by the MgO tunnel barrier TB of typical thickness of 0.6 to 2 nm. This thickness makes it possible to control the resistance×area (RA) product of the junction. In STT-MRAMs, this RA product is generally chosen between 1 and 10 Ωm² so that the tunnel junction has a resistance comparable to that of the selection transistor in ON mode which is connected to the tunnel junction.

The tunnel barrier TB is surmounted by the magnetic storage electrode SL constituted in this first embodiment of a single layer of magnetic material made of alloy based on Co, Fe, Ni and an amorphising element, preferably boron but other amorphising elements could be used such as Zr or Nb. The thickness of this layer will be chosen between 0.5 and 8 times the targeted diameter for the tunnel junction after nanostructuring.

This ferromagnetic layer is surmounted by one or more metal layers T₂. A first aim of this metal layer is to absorb the amorphising element outside of the magnetic storage electrode during the post-deposition annealing necessary for the good crystallisation of the tunnel barrier and the magnetic electrodes. This layer able to absorb the amorphising element may be made of tantalum (Ta), tungsten (W), molybdenum (Mo), etc.

Optionally, several laminations of this layer able to absorb boron or the amorphising element may be introduced into the thickness of the ferromagnetic storage layer to improve the re-crystallisation of the alloy. For example a 16 nm layer of CoFeB surmounted by a 4 nm layer of Mo could be replaced by a 2 nm (CoFeB 4 nm/Mo 2 nm)₄/Mo multilayer.

The ferromagnetic storage layer SL may also be surmounted by a second oxide layer (second tunnel barrier) intended to reinforce the perpendicular anisotropy of the storage layer. In this case, in addition to the shape anisotropy of the storage layer, this also benefits from the interface anisotropy not only at the interface with the tunnel barrier but also at the interface with this second oxide layer. It is then necessary to see to it that one or more layers able to absorb the amorphising element of the storage layer are inserted into the storage layer as described previously. As is known to those skilled in the art, the second tunnel barrier must have a resistance*area product sufficiently low compared to the first tunnel barrier that provides the tunnel magnetoresistance signal so as not to too reduce this signal due to the resistance in series associated with this second tunnel barrier. Other functions of the upper metal layer(s) T2 are to enable an electrical contact at the summit of the structure and optionally to serve as hard mask for etching during the etching of the tunnel junction.

The structure described in FIG. 4 is presented in “top” configuration. It goes without saying that the “bottom” configuration may also be produced by reversing the stack, that is to say with the storage layer under the tunnel barrier and the reference layer made of the SAF layer above the barrier.

FIG. 5 illustrates a magnetic tunnel junction PSA-MRAM-2 according to a second embodiment of the invention.

The magnetic tunnel junction PSA-MRAM-2 according to the invention includes from bottom to top:

-   -   a lower electrical contact layer T1,     -   a metal growth layer M,     -   a synthetic antiferromagnetic SAF constituted of two         ferromagnetic layers antiferromagnetically coupled through a         coupling layer RKKY for example of Ru of 0.3 nm to 0.8 nm         thickness,     -   a structural transition layer TS able to absorb boron for         example made of Ta or W,     -   a reference layer RL typically made of CoFeB,     -   a tunnel barrier TB usually made of MgO,     -   a storage layer SL having a vertically elongated aspect ratio,         the storage layer being formed of an interfacial part I for         example made of FeCoB, a thin transition layer TR, for example         made of Ta or W or Mo and a thick ferromagnetic layer FM.     -   a metal layer T2 serving as upper electrical contact and         optionally as hard mask during the etching of the memory point.         The symmetrical “bottom” configuration is also possible.

Thus, in this second embodiment PSA-MRAM-2, the storage layer SL, instead of being constituted of a homogeneous material, is constituted of an assembly of magnetic and non-magnetic layers as illustrated for example in FIG. 5. In particular, if the tunnel barrier is made of MgO as is usually the case, it is advantageous to conserve near to the interface with the tunnel barrier TB an interfacial layer I of CoFeB alloys of 1.5 to 3 nm thickness making it possible to obtain a strong tunnel magnetoresistance. Strong tunnel magnetoresistance is taken to mean a magnetoresistance of at least 100%. It may be recalled that the magnetoresistance (TMR) corresponds to the relative variation of resistance of the structure between the minimum value R_(min) obtained in the parallel magnetic configuration of the magnetisations of the electrodes of the magnetic tunnel junction and the maximum value R_(max) obtained when the magnetisations are antiparallel. The TMR is defined by TMR=(R_(max)−R_(min))/R_(min). This thin magnetic layer I may be associated with a thick NiFe layer or alloys based on Co, Fe, Ni and optionally other additives (V, Al, Mo, etc.) having in particular a low Gilbert dampening. Low Gilbert dampening is taken to mean a dampening less than 0.02. This layer is noted FM. Advantageously, the two magnetic layers are separated by a non-magnetic layer TR for example of Mo, W or Ta of 0.2 to 0.4 nm thickness making it possible to absorb boron from the CoFeB layer during the post-deposition annealing necessary for the correct crystallisation of the MgO barrier and CoFeB electrodes as is known in STT-MRAMs of the prior art.

FIG. 6 shows A as a function of D in the macrospin approximation, for a cylinder with K_(S)=0 J/m² and K_(u)=0 J/m³. These curves clearly show that a maximum of Δ(D) is always attainable, whatever the value of the thickness and the M_(s) of the layer. Being placed around this maximum is advantageous because this shows that the thermal stability factor Δ is then slightly dependent on the exact diameter of the pillar constituted by the magnetic tunnel junction. It is easy to be convinced of this by plotting these same curves for different values of K_(S) and K_(u) which, in the operating regime of PSA-MRAMs, the function Δ(D) always has a single maximum. Thus, even in the presence of given interfacial and volume anisotropy: K_(S) and K_(u), there exists a single optimal solution {L^(opti), M_(S) ^(opti)} which minimises the effects of a variability in diameter on the stability, for a predefined stability and technological node (i.e. a diameter).

The calculations below present an analytical resolution of the parameters {L^(opti), M_(S) ^(opti)} in the limit of the approximation of the approximate expression of the demagnetising factors of a uniformly magnetised cylinder mentioned above. The numerical applications will be made for certain anisotropy values K_(S) and K_(u) typically achievable with materials known to those skilled in the art. The invention is in no way limited to the case of the uniformly magnetised cylinder or to the anisotropy values chosen as an example. In order to simplify the expressions, constants “a”, “b” and “c” are introduced into the expression of the thermal stability factor.

$\Delta = {{{aLD}^{2}\left( {1 - \frac{3D}{D + {bL}}} \right)} + {{cD}^{2}\left( {{K_{u}L} + K_{S}} \right)}}$

where

$a = \frac{{\pi µ}_{0}M_{S}^{2}}{16\mspace{14mu} k_{B}T}$ $b = \frac{4}{\sqrt{\pi}}$ $c = \frac{\pi}{4\mspace{14mu} k_{B}T}$

The optimisation condition is written:

$\frac{\partial\Delta}{\partial D} = {{\frac{2\Delta}{D} - \frac{3{abL}^{2}D^{2}}{\left( {D + {bL}} \right)^{2}}} = {\left. 0\Rightarrow a \right. = \frac{2{\Delta \left( {D + {bL}} \right)}^{2}}{3{bL}^{2}D^{3}}}}$

This expression of “a” is injected into the expression of the thermal stability factor. After simplifications, it is possible to extract a quadratic equation in L.

${{L^{2}\left\lbrack {\frac{1}{2} + \frac{3{cD}^{3}K_{u}}{4b\; \Delta}} \right\rbrack} + {L\left\lbrack {{- \frac{5D}{4b}} + \frac{3{cD}^{3}K_{S}}{4b\; \Delta}} \right\rbrack} - \frac{D^{2}}{b^{2}}} = 0$

Among the two roots L_(±), only L₊ is positive and thus corresponds to the optimal thickness previously designated L^(opti).

$L^{opti} = {\frac{1}{1 + \frac{3{cD}^{3}K_{u}}{2b\; \Delta}}{\quad\left\lbrack {\frac{5D}{4b} - \frac{3{cD}^{3}K_{S}}{4b\; \Delta} + \sqrt{\left( {\frac{5D}{4b} - \frac{3{cD}^{3}K_{S}}{4b\; \Delta}} \right)^{2} + {\frac{2D^{2}}{b^{2}}\left( {1 + \frac{3{cD}^{3}K_{u}}{2b\; \Delta}} \right)}}} \right\rbrack}}$

M_(S) ^(opti) is deduced therefrom:

$M_{S}^{opti} = \sqrt{\frac{16\mspace{14mu} k_{B}T}{\pi \; µ_{0}}\frac{2{\Delta \left( {D + {bL}^{opti}} \right)}^{2}}{3{b\left( L^{opti} \right)}^{2}D^{3}}}$

As an example, several examples of standard magnetic materials are cited having a magnetisation M_(S) ^(FM opti) which minimises the variability of Δ₃₀₀ for junction diameter values between 10 nm and 25 nm:

-   -   FM=cobalt. A layer of 15 nm of Co (M_(S)=1.446 10⁶ A/m, K_(u)=0         J/m³) corresponds to the optimal layer for a junction diameter         of D=10.8 nm.     -   FM=iron. A layer of 13.4 nm of Fe (M_(S)=1.714 10⁶ A/m, K_(u)=0         J/m³) corresponds to the optimal layer for a junction diameter         of D=9.6 nm.     -   FM=Permalloy (Py). A layer of 23.1 nm of Py (M_(S)=0.756 108         A/m, K_(u)=0 J/m³) corresponds to the optimal layer for a         junction diameter of D=16.6 nm.     -   FM=CoFe alloys. These alloys are optimal for junction diameters         comprised between 10 and 15 nm.     -   FM=Co₂FeAl (full-Heusler). A layer of around 6 nm of Co₂FeAl         (M_(s)=1.3 10⁶ A/m, K_(u)=0.3 10⁶ J/m³) corresponds to the         optimal layer for junction diameters of around 25 nm.

Finally, in the case of a bilayer comprising an interface layer based on FeCoB of which the properties are assumed to be optimised for other reasons (TMR, RA, spin polarisation, etc.) as well as a volume layer noted FM, the optimal characteristics (optimal thickness L^(FM opti) and optimal magnetisation M_(s) ^(FM opti)) of the layer FM are given by:

$\quad\left\{ \begin{matrix} {L^{{FM}\mspace{11mu} {opti}} = {L^{opti} - L^{FeCoB}}} \\ {M_{S}^{{FM}\mspace{11mu} {opti}} = \frac{{M_{S}^{opti}L^{opti}} - {M_{S}^{FeCoB}L^{FeCoB}}}{L^{opti}}} \end{matrix} \right.$

This point corresponds to the maxima of the iso-M_(S) of FIG. 6 or instead to the minima iso-Δ of FIG. 3. FIGS. 7A-7D represent L^(FM opti) and M_(S) ^(FM opti) as a function of the technological node (identified here at the diameter of the memory point) for a stability Δ=60 to 300 K, for a stack having or not surface anisotropy. Two volume anisotropy values are presented therein.

The graphs illustrated in FIGS. 7A to 7D represent the graphs of M_(S) ^(FM opti) and L^(FM opti) calculated for different anisotropy values K_(s) and K_(u) as a function of the diameter of the tunnel junction.

In order to minimise the dispersion of thermal stability factor and writing current from one memory point to the next, a position will be taken in conditions such that

${\frac{\partial\Delta}{\partial D}} < {crit}$

Where crit is a positive dispersion tolerance constant. This tolerance is defined by the fact that the distributions of writing voltage, reading voltage and dielectric breakdown voltage have to be well separated as is known to those skilled in the art. Typically, it will be sought to have a dispersion of Δ less than 40 (that is to say for example Δ=80±20 for a dispersion of diameter of tunnel junctions of ±2 nm) i.e.

${\frac{\partial\Delta}{\partial D}} < {10\mspace{14mu} {{nm}^{- 1}.}}$

However to produce high capacity memories (several Gbits), it will be necessary to have a narrower writing voltage distribution thus a stricter criterion

${\frac{\partial\Delta}{\partial D}} < {3\mspace{14mu} {nm}^{- 1}}$

or even

${\frac{\partial\Delta}{\partial D}} < {1\mspace{14mu} {{nm}^{- 1}.}}$

This signifies working closer and closer to the optimal condition defined by L^(FM opti) and Ms^(FM opti).

In the case of a storage layer constituted of a single homogeneous material of uniform magnetisation, the condition

${\frac{\partial\Delta}{\partial D}} < {crit}$

is written

${{\frac{2\Delta}{D} - \frac{3\mspace{11mu} {abL}^{2}D^{2}}{\left( {D + {bL}} \right)^{2}}}} < {crit}$

where the constants a and b have been defined previously.

FIG. 6 illustrates the zones of parameters (diameter (D), thickness (L)) in which a value

$\frac{\partial\Delta}{\partial D}$

is obtained below a certain criterion crit equal to 5, 10, or 20 nm⁻¹ in the figure. The figure is represented in multiscale form making it possible to cover different types of materials represented by their magnetisation in colour code. To establish this figure, the variations of stability δΔ are calculated, which implies a given variation of diameter δD (that is to say

$\left. {\frac{\partial\Delta}{\partial D}} \right),$

as a function of the parameters D, Δ, L and M_(S) and by considering K_(S)=0 and K_(u)=0. The value of

$\frac{\partial\Delta}{\partial D}$

is then plotted in hatching code as a function of Δ (Y-axis) and of D (X-axis), for all M_(s) (colour code) and for different values of L (coloured axes). Vertical hatchings indicate that

${{\frac{\partial\Delta}{\partial D}} < {5\mspace{14mu} {nm}^{- 1}}},$

horizontal hatches indicate that

${5 < {\frac{\partial\Delta}{\partial D}} < {10\mspace{14mu} {nm}^{- 1}}},$

the cross hatchings indicate that

$10 < {\frac{\partial\Delta}{\partial D}} < {20\mspace{14mu} {nm}^{- 1}}$

and everything that is beyond the hatchings indicates that

${\frac{\partial\Delta}{\partial D}} > {20\mspace{14mu} {{nm}^{- 1}.}}$

For example, it is reasonable to consider that Δ must not vary by more than ±20 for variations of diameter of ±2 nm, i.e.

${\frac{\partial\Delta}{\partial D}} < {10\mspace{14mu} {{nm}^{- 1}.}}$

Thus, the vertical and horizontal hatched zones show all the domain in which it is possible to be placed while satisfying this property. For example, let us consider the case of cobalt (curve iso-M_(s)=Co) with a thickness L=15 nm (blue axes). The optimal conditions

$\left( {{\frac{\partial\Delta}{\partial D}} = 0} \right)$

of this case correspond to the maximum of the iso-M_(s) and roughly corresponds to the operating point {D=10.9 nm, Δ=60}. On the other hand, if the criterion is

${\frac{\partial\Delta}{\partial D}} < {10\mspace{14mu} {nm}^{- 1}}$

for example instead of being

${{\frac{\partial\Delta}{\partial D}} = 0},$

but that it is specifically wished to have Δ=55, then it is possible by moving towards the left on the iso-M_(s) to find an operating point {D=8.8 nm, Δ=55} which always satisfies the desired criterion. The criterion is no longer satisfied for around D<8.1 nm, which leaves the possibility of having a method variability of ±0.7 nm.

FIG. 8 shows another manner of presenting the influence of the variability of the thermal stability factor for a given variability in cell diameter SD (1 nm or 2 nm in FIG. 8) as a function of the diameter of the cell in different surface and volume anisotropy conditions. For each diameter value, and fixed anisotropy parameters Ks and Ku, the optimal conditions of thickness and of magnetisation {L^(opti), M_(S) ^(opti)} are chosen.

To do so, the results presented in FIG. 8, are calculated in the following manner. The X-axis represents the target diameter D. The Y-axis represents a variable parameter Δ, K_(S) or K_(u), the two others being fixed. For each point of the diagrams, the optimal parameters {L^(opti), M_(S) ^(opti)} are calculated via the method described previously. By using all of these parameters, the relative variation of maximal stability δΔ (in % of the target stability Δ) is plotted in colour code during a variability of the diameter D±δD. In other words, for all diameter values E [D−δD; D+δD], there is stability ∈[Δ(1−δΔ); Δ(1+δΔ)]. The diagrams are calculated for δD=1 nm (left column) and δD=2 nm (right column). These diagrams make it possible to conclude that for the largest diameters (D>15 nm), it may be advantageous to have a surface or volume anisotropy since the latter reduce the variability δΔ. On the other hand they only have little influence at small diameters (D<15 nm). In addition, for the largest diameters, the variability δΔ is generally less than 2%, which is low and which makes it possible to be positioned relatively far from the optimal conditions presented in the present patent. On the other hand, the smaller the diameter, the more the variability δΔ at the optimal conditions increases. As an example, δΔ reaches some 40% for δD=1 nm at D=2.7 nm, and δΔ reaches some 40% for δD=2 nm at D=5.3 nm. Thus, if δD=2 nm is the uncertainty on the method and δΔ=40% the maximum allowed stability variation, then if the target diameter is 5 nm, then it is necessary to be placed very close to the optimal conditions {L^(opti), M_(S) ^(opti)} since elsewhere the variability δΔ can only get worse.

It is to be noted that in certain situations and in particular towards the smallest technological nodes (4 nm), it may become impossible to find a material having an optimal magnetisation M_(S) ^(FM opti), whether it is for purely physical reasons (for example no material having the optimal magnetisation if it is too high) or because said materials do not satisfy other criteria (for example necessity of having a low Gilbert dampening). This can take place in particular towards the smallest technological nodes in so far as, generally speaking, the optimal magnetisation of the material of the ferromagnetic storage layer increases when the diameter of the tunnel junction decreases. In this case, if it becomes impossible to satisfy the equality

${\frac{\partial\Delta}{\partial D} = 0},$

it will be sought to be placed at the lowest accessible point

$\left( {\frac{\partial\Delta}{\partial D}} \right).$

An analysis of the diagrams such as that given in FIG. 7 leads to the fact that it is necessary to choose the material having the greatest magnetisation M_(s) (with M_(s)<M_(S) ^(opti)), then to adapt the thickness to obtain the desired stability. In this case, the thickness is obtained according to:

$L = {\frac{1}{2\left( {{abD}^{2} + {{bcD}^{2}K_{u}}} \right)}{\quad\left\lbrack {\left( {{2{aD}^{3}} + {b\; \Delta} - {{cD}^{3}K_{u}} - {{bcD}^{2}K_{S}}} \right) + \sqrt{\begin{matrix} {\left( {{2{aD}^{3}} + {b\; \Delta} - {{cD}^{3}K_{u}} - {{bcD}^{2}K_{S}}} \right)^{2} +} \\ {4\left( {{abD}^{2} + {{bcD}^{2}K_{u}}} \right)\left( {{D\; \Delta} - {{cD}^{3}K_{S}}} \right)} \end{matrix}}} \right\rbrack}}$

It is to be noted that the values of L^(FM opti) and Ms^(FM opti) depend on temperature. Advantageously, for a device having to operate over a temperature range of T_(min) to T_(max), for example 0° C. to 85° C., it will be sought to come closer to the optimal conditions at the average temperature of use T_(m)=(T_(min)+T_(max))/2.

It should also be noted that it is also possible to give to the reference layer a vertically elongated shape in order to increase its perpendicular anisotropy. However a drawback is that then the field radiated by this layer on the storage layer becomes very important such that it can become necessary to compensate this radiated field by the application of a compensation magnetic field.

FIG. 9 describes a method P for manufacturing the tunnel junction PSA-MRAM-1 or PSA-MRAM-2 according to the invention.

In particular, FIG. 9 illustrates: (a) the deposition of all the layers constituting the stack, (b) reactive ion etching of the upper electrode, (c) ion etching of the thick layer FM belonging to the storage layer, (d) ion etching of the remainder of the tunnel junction and (e) reactive ion etching of the lower electrode;

The method P according to the invention includes the following steps:

-   -   Deposition D of all of the layers by vapour phase deposition;     -   Etching RIE of the storage layer or thick magnetic layer by         reactive ion etching;     -   Etching IBE of the other layers by ion beam etching.

After deposition of all the layers by a vapour phase deposition method such as cathodic sputtering, a hard mask is defined by lithography and etching on the surface of the stack. The layer constituting the hard mask may for example be made of tantalum which is easily etched by reactive ion etching.

Next, advantageously, it will be sought to etch the thick magnetic layer by reactive ion etching. Several articles describe means for etching Permalloy or cobalt by reactive ion etching using reactive gases based on methanol or carbon monoxide optionally combined with argon (Development of methanol based reactive ion etching process for nanoscale magnetic devices, M. T. Moneck and J. G. Zhu, NSTI-Nanotech 2011). Since this magnetic layer is thick, it is particularly advantageous to try etching by reactive ion etching to avoid a lot of deposition of this etched magnetic material. If the thick magnetic layer is constituted of several magnetic elements, it is then possible to etch by reactive ion etching at least the thickest of the two.

Next, the remainder of the structure may be etched by ion beam etching (IBE) in so far as the layers in play are much thinner. This method is compatible with high memory point densities (technological node <10 nm) since the etching of the junction is almost entirely carried out by reactive ion etching and that the storage layer may itself be constituted of a thick hard mask for the etching of the lower part of the stack.

In a second embodiment described in FIG. 5, the thick ferromagnetic storage layer includes at least two different magnetic materials. A first magnetic material in contact with the tunnel barrier makes it possible to obtain a strong tunnel magnetoresistance. As in conventional p-STT-MRAMs, this interfacial layer will preferentially be made of alloy based on Co, Fe and B or other amorphising element. A second magnetic material is then deposited in the part of the storage layer further away from the tunnel barrier. This second material is chosen to have a low Gilbert dampening a. Indeed, the current required for writing by STT being proportional to the Gilbert dampening averaged over the whole volume of the layer, it is preferable to minimise this average dampening. Materials with low Gilbert dampening are Permalloy (Ni₈₀Fe₂₀), CoFe alloys of concentration close to Co₂₅Fe₇₅, Heusler alloys. These two magnetic materials being able to have different crystallographic structures, a structural transition layer able to absorb the amorphising element during post-deposition annealing could be introduced between the two layers of the two magnetic materials as represented in FIG. 5. The other constituent layers of the stack are similar to those discussed for the first embodiment of FIG. 4.

In a third embodiment, a magnetic tunnel junction PSA-SOT according to the invention is integrated in a SOT-MRAM cell.

The device may be produced in “top” configuration, illustrated in FIG. 10A or “bottom” configuration, illustrated in FIG. 10B.

The magnetic junction PSA-SOT according to the invention illustrated in FIG. 10A includes from bottom to top:

-   -   a lower electrical contact layer or terminal T1,     -   a metal growth layer M,     -   a synthetic antiferromagnetic SAF constituted of two         ferromagnetic layers antiferromagnetically coupled through a         coupling layer RKKY for example of Ru of 0.3 nm to 0.8 nm         thickness,     -   a structural transition layer TS able to absorb boron for         example made of Ta or W,     -   a reference layer RL typically made of CoFeB,     -   a tunnel barrier TB usually made of MgO,     -   a storage layer SL having a vertically elongated aspect ratio,         the storage layer being formed of an interfacial part I for         example made of FeCoB, a thin transition layer TR, for example         made of Ta or W or Mo, and a thick ferromagnetic layer FM;     -   a metal line LM parallel to the plane of the layers and in         contact with the storage layer SL and comprising a second         electrical contact or terminal T2 and a third electrical contact         or terminal T3.

As is known to those skilled in the art, the cells of SOT-MRAMs have 3 terminals, T1, T2 and T3. During writing, the magnetisation of the storage layers L is switched by making a current pulse circulate in a conductive line LM parallel to the plane of the layers. The material of the conductive line LM is chosen to have a high spin Hall angle. This line may be for example made of non-magnetic metal such as Pt, Ta, W, Ir or made of antiferromagnetic metal such as IrMn or PtMn or other heavy material with strong spin orbit. A spin orbit effect known as spin Hall effect taking place in this conductive line LM makes it possible to inject a spin polarised current into the storage layers L. This spin current makes it possible to switch the magnetisation of the storage layers L. As is known to those skilled in the art, when the magnetisation of the storage layers L is out-of-plane, it is necessary to apply a static longitudinal field (substantially parallel to the conductive line) to make the switching deterministic. This field may be created by inserting at the base or at the top of the stack a layer of hard material radiating a static field on the storage layer or by using the exchange anisotropy field produced at the interface between the storage layer and the conductive line of heavy metal when it is antiferromagnetic as described in the article: S. Fukami, C. Zhang, S. Dutta Gupta, A. Kurenkov and H. Ohno, Magnetization switching by spin-orbit torque in an antiferromagnet-ferromagnet bilayer system, Nat. Mat. 15, 535 (2017).

FIG. 10B illustrates a tunnel junction PSA-SOT of “bottom” type.

In a fourth embodiment, the magnetic tunnel junction is used in a MRAM cell with voltage controlled writing. Such a tunnel junction with electric voltage controlled writing VC-MRAM is illustrated in FIG. 11.

The tunnel junction with electric voltage controlled writing according to the invention includes from bottom to top:

-   -   a lower electrical contact layer T1,     -   a metal growth layer M,     -   a synthetic antiferromagnetic SAF constituted of two         ferromagnetic layers antiferromagnetically coupled through a         coupling layer RKKY for example of Ru of 0.3 nm to 0.8 nm         thickness,     -   a structural transition layer TS able to absorb boron for         example made of Ta or W,     -   a reference layer RL typically made of CoFeB,     -   a tunnel barrier TB usually made of MgO,     -   a storage layer SL having a vertically elongated aspect ratio,         the storage layer being formed of an interfacial part I for         example made of FeCoB, a thin transition layer TR, for example         made of Ta or W or Mo, and a thick ferromagnetic layer FM.     -   a metal layer T2 serving as upper electrical contact and         optionally as hard mask during the etching of the memory point.         The “bottom” symmetrical configuration is also possible.

As is known to those skilled in the art, the magnetic properties of certain magnetic materials may be controlled by electrical field. In particular, the interfacial anisotropy at the oxide/magnetic metal interface may be modulated by the application of an electrical field through the oxide as described for example in: Induction of coherent magnetization switching in a few atomic layers of FeCo using voltage pulses, Y. Shiota, T. Nozaki, F. Bonell, S. Murakami, T. Shinjo, and Y. Suzuki, Nat. Mat. 11, 39 (2012). Also, the volume properties of multiferroic magnetic materials may be modulated by electrical field. Thus the storage layer may be designed by playing on the modulation of the interface anisotropy, either by playing on the modulation of one volume magnetisation, or both, such that the application of a voltage to the terminals of the tunnel junction modifies the anisotropy from out-of-plane to in-plane initiating a rotation of the magnetisation from out-of-plane to in-plane. Given the precessional movement induced by this initial rotation, by controlling the duration of the voltage pulse so that it is of the order of half the precession period, it is possible to switch the magnetisation from the “upwards” direction to the “downwards” direction or vice versa. The reading is carried out under lower voltage making it possible to measure the magnetic state of the junction by the tunnel magnetoresistance, the voltage being sufficiently low so as not to perturb the magnetic state of the junction. Such a tunnel junction with electric voltage controlled writing is illustrated in FIG. 11. Generally speaking, these junctions have a barrier thickness slightly greater than in junctions with spin transfer writing to minimise the current circulating through the barrier during writing.

In a fifth embodiment, the junction according to the invention is inserted as non-volatile element in a logic component of different possible natures. Different components and non-volatile logic circuits have been proposed over the few last years based on conventional tunnel junctions using very thin storage layers (1 to 3 nm thickness). These same components and circuits may be produced by substituting these tunnel junctions of the prior art by the tunnel junctions according to the invention. As an example, FIG. 12 shows a non-volatile latch including two magnetic tunnel junctions according to the invention, represented in grey. This circuit is adapted from the patent application US2015/0036415 A1.

Thermal Stability

According to another embodiment, the magnetic tunnel junction comprises a storage layer having a thickness comprised between 0.8 and 8 times a characteristic dimension of a planar section of the tunnel junction, the contribution to the energy barrier due to the shape anisotropy of the storage layer being at least two times greater and preferably at least four times greater than the contributions to the energy barrier of interfacial origin.

Energy barrier separating the two magnetisation states of the storage layer is taken to mean energy difference between the minimum energy corresponding to the initial stable state of the magnetisation of the storage layer and the maximum energy encountered during the reversal of the magnetisation to its final stable state. Planar section of the tunnel junction is taken to mean a section of the tunnel junction along the plane of the layers forming the tunnel junction.

Characteristic dimension of a planar section is taken to mean a dimension of said planar section. For example, in the case of a tunnel junction having a circular section, the characteristic dimension of a planar section of the tunnel junction may be chosen as being the radius of the circle. In the case of an elliptical section, the characteristic dimension may be chosen as being the small axis or the large axis of the ellipse.

For example, the contribution to the energy barrier due to the shape anisotropy of the storage layer may be given by the following formula:

${- \frac{\mu_{0}}{4}}\left( {1 - \frac{3}{1 + {4{{AR}/\sqrt{\pi}}}}} \right){M_{s}^{2}(T)}{AL}$

For example, the contribution to the energy barrier of interfacial origin may be given by the following formula:

Δ(K _(s1) +K _(s2))

The explanation for the symbols used in these formulas has been given above.

It is possible to consider that these contributions to the energy barrier are calculated at a temperature T_(m) being the average temperature of use of the magnetic junction.

In the prior art, p-STT-MRAMs have always used very thin storage layers of which the thickness is much lower than the diameter. This was motivated in particular by the fact that spin transfer being an interfacial phenomenon (taking place typically over the first nanometre from the interface through which the spin polarised current is injected), it is preferable to use very thin layers so as not to dilute the efficiency of the spin transfer torque. For such very thin layers, the shape anisotropy favours an in-plane orientation of the magnetisation of the storage layer and thus opposes the interfacial anisotropy which, for its part, favours a perpendicular orientation of this magnetisation. This leads to an effective anisotropy of relatively average amplitude resulting from the competition of these two anisotropy terms. Furthermore, this anisotropy strongly depends on temperature because thermal magnetisation fluctuations develop more rapidly when the temperature increases in a very thin layer (thickness of the storage layer in p-STT-MRAMs of the prior art ˜1.4 nm to 2 nm) than in a thick layer of the same material.

The present invention proposes reducing this temperature dependency of the anisotropy by completely changing the paradigm by using a much thicker storage layer, that is to say of which the thickness is at least 80% of a planar dimension characteristic of the storage layer (length of the small axis for a memory point of elliptical shape or diameter for a memory point of cylindrical shape) such that the shape anisotropy also favours an out-of-plane orientation of the magnetisation and even becomes the main source of perpendicular anisotropy of the storage layer. The basic idea is that the interfacial anisotropy at the CoFeB/MgO interfaces used in STT-MRAMs of the prior art depends much more strongly on temperature than the shape anisotropy of a thick layer which varies proportionally to M_(s) ², knowing that for a thick layer the thermal variation of M_(s)(T) is close to that of the bulk material of same composition. In a magnetic tunnel junction PSA-STT-MRAM according to the invention, the shape anisotropy and the interface anisotropy have the same sign and thus add to each other such that both favour an orientation perpendicular to the plane of the layers of the magnetisation of the storage layer. However, since the interface anisotropy varies more rapidly with temperature than the shape anisotropy, it will be sought to increase the relative role of the shape anisotropy compared to the interface anisotropy to minimise the dependency of the total anisotropy at the operating temperature.

To clearly understand the idea, the most common case of a tunnel junction of which the storage layer has a quasi-cylindrical shape is used here. In this case and assuming that the storage layer is constituted of a single magnetisation material M_(s), the energy barrier separating the two “upwards” and “downwards” magnetisation states may be expressed by:

${\Delta \; {E(T)}} = {A\left\lbrack {{K_{s\; 1}(T)} + {K_{s\; 2}(T)} - {\frac{\mu_{0}}{4}\left( {1 - \frac{3}{1 + {4\; {{AR}/\sqrt{\pi}}}}} \right){M_{s}^{2}(T)}L} + {{K_{u}(T)}L}} \right\rbrack}$

This expression shows that from the moment that the aspect ratio of the storage layer exceeds

${AR} = {\frac{\sqrt{\pi}}{2} \approx 0.89}$

then the shape anisotropy term

${- \frac{\mu_{0}}{4}}\left( {1 - \frac{3}{1 + {4{{AR}/\sqrt{\pi}}}}} \right)M_{s}^{2}L$

changes sign to pass from negative to positive. In other words, for a thickness/diameter aspect ratio greater than 0.89, the shape anisotropy is added to the perpendicular interface anisotropy present at the tunnel barrier/storage layer interface. In this expression, the anisotropy K_(u) of magnetocrystalline or magnetoelastic origin is in general negligible compared to the other anisotropy terms, with the materials commonly used such as alloys based on Co, Fe and Ni deposited by cathodic sputtering. The barrier height ΔE(T) thus depends on temperature through the temperature dependency of the interfacial anisotropy Δ(K_(s1)(T)+K_(s2)(T)) and that of the shape anisotropy

${- \frac{\mu_{0}}{4}}\left( {1 - \frac{3}{1 + {4{{AR}/\sqrt{\pi}}}}} \right){M_{s}^{2}(T)}{{At}.}$

The thermal variations of these two anisotropy terms are compared below.

FIG. 13 illustrates this. This figure shows the evolution as a function of temperature of the thermal stability factor of tunnel junctions of the prior art up to 260° C. To have an error rate per bit less than 10⁻⁴ for 60 seconds at 260° C. it is necessary that the thermal stability factor Δ satisfies the relationship

${\frac{t}{\tau_{0}}{\exp \left( {- \Delta} \right)}} < 10^{- 4}$

where t=60s, τ₀=10⁻⁹s. This imposes Δ>34. FIG. 13 shows that this is only satisfactory for the largest junctions of diameter greater than 100 nm. Furthermore, if the thermal variation of the stability factor is extrapolated to room temperature at 25° C., it is found that it reaches 115 which is much more than required per bit for a retention of 10 years. This implies that the writing current and the writing voltage will have to be over-dimensioned at 25° C. at the price of increased electrical consumption and reduced writing endurance to satisfy the retention criterion of 60s at 260° C.

FIG. 14 shows typical variations of interfacial anisotropies such as those of the storage layers of magnetic tunnel junctions of the prior art. Figure shows in fact the contributions to the interfacial anisotropy of first order (uniaxial in sin² θ, θ angle between the magnetisation of the storage layer and the normal to the plane of the layers) and of second order (in sin⁴ θ) of W/CoFeB/MgO multilayers with different thicknesses of CoFeB (Kyoung-Min Lee, Jun Woo Choi, Junghyun Sok, and Byoung-Chul Min, Temperature dependence of the interfacial magnetic anisotropy in W/CoFeB/MgO, AIP Advances 7, 065107 (2017)). The second order contribution is much less than that of the first order and may be neglected. This figure shows that the interfacial anisotropy coming from the CoFeB/MgO interface decreases by around a factor of 2 between 300K (27° C.) and 400K (127° C.) and extrapolates to zero well before reaching 260° C. This indicates strong thermal variations of this interfacial anisotropy as discussed previously in relation with FIG. 13.

FIG. 15 presents the thermal variation of the magnetisation of a bulk material such as cobalt of which the Curie temperature is high: 1394K (curve extracted from Ferromagnetism, Bozorth, Van Nostrand company, Inc.). This curve shows that the thermal variation of the magnetisation of cobalt is less than 4% between 0° C. and 260° C. If the storage layer of the STT-MRAM is a thick layer based on cobalt, the shape anisotropy term

${- \frac{\mu_{0}}{4}}\left( {1 - \frac{3}{1 + {4{{AR}/\sqrt{\pi}}}}} \right){M_{s}^{2}(T)}{AL}$

proportional to M_(s) ²(T)will only vary by 8%, which is much less than the factor of at least 2 of the thermal variation of the interfacial anisotropy.

To reduce the thermal variation of the effective anisotropy, there is thus every interest to reduce the relative weight of the interfacial anisotropy compared to the volume anisotropy in the total anisotropy of the storage layer. This is contrary to perpendicular tunnel junctions of the prior art in which the perpendicular anisotropy stems entirely from the interfacial anisotropy at the MgO/CoFeB interface. Reducing the interfacial anisotropy in the present invention could be achieved in particular by using an alloy rich in cobalt at the level of the interface with the MgO barrier in so far as it is known that the perpendicular anisotropy at the MgO/cobalt interfaces is lower than that at the MgO/Fe interfaces (Yang, H. X., M. Chshiev, B. Dieny, J. H. Lee, A. Manchon, and K. H. Shin, 2011, “First principles investigation of the very large perpendicular magnetic anisotropy at Fe|MgO and Co|MgO interfaces,” Phys. Rev. B 84, 054401). Furthermore, since cobalt has a Curie temperature higher than iron, this remaining interfacial anisotropy will vary less with temperature than the interfacial anisotropy at the MgO/Fe interface.

In particular, the energy barrier may be written in a simplified manner by ignoring the volume anisotropy of magnetocrystalline or magnetoelastic origin:

ΔE(T)=A[K _(s)(T)+K _(v)(T)L]

where K_(s)(T) groups together terms of interfacial anisotropy and Kv(T) the volume shape anisotropy proportional to Ms². As shown in FIGS. 14 and 15, the interface anisotropy decreases in general much quicker with temperature than the volume anisotropy.

Typically, according to FIG. 14, the interface anisotropy K_(s) at the MgO/FeCoB interfaces varies by around 50% for a thermal variation of 100° C. around room temperature. For materials such as Co the variation of M_(s) ² and thus K_(v) is only 6%. If it is wished to have a variation of the barrier height ΔE and thus of the writing current of less than 20%, it is necessary that the proportion X of the shape anisotropy compared to the interface anisotropy is chosen such that 20%>(50%+X*6%)/(1+X) i.e. X>2.14 which can be approximated to 2. If it is wished that this variation is lower than 15%, then it is necessary to increase the proportion of volume anisotropy such that 15%>(50%+X*6%)/(1+X) i.e. X>3.89 which can be approximated by 4.

To summarise, if the shape anisotropy is two times greater than the interface anisotropy, by using a material for the storage layer with high Curie temperature such as an alloy rich in cobalt, the variation of the barrier height and thus of the writing current will be of the order of 20% for a variation of temperature of 100° C. around room temperature.

If the shape anisotropy is four times greater than the interface anisotropy, the variation of the barrier height will be 15%. To the extent that the shape anisotropy would be much greater than the interface anisotropy, this variation could be reduced to values of the order of 6% if the storage layer has a very high Curie temperature such as cobalt.

It is thus possible to increase the relative weight of the volume anisotropy (which depends slightly on temperature) compared to the interface anisotropy (which depends strongly on temperature) and to combine this effect with the optimisation of the choice of the magnetisation of the main constituent material of the tunnel junction and the thickness of the latter to minimise the effects of dispersion of properties from memory point to memory point during the manufacture of a memory chip, as is explained above. 

1. Magnetic random access memory point of SOT-MRAM type comprising: an electrical contact layer, a magnetic tunnel junction with out-of-plane magnetisation including: a storage layer having a magnetisation switchable between two magnetisation states normal to the plane of the layer; a reference layer having a fixed magnetisation and normal to the plane of the reference layer; a tunnel barrier layer separating the storage layer and the reference layer; a metal line parallel to the plane of the layers and in contact with the storage layer including at least one second electrical contact, the two magnetisation states of the storage layer being separated by an energy barrier, said magnetic tunnel junction having a thermal stability factor dependent on the energy barrier and on the temperature of use of the magnetic tunnel junction, wherein: the storage layer has a thickness comprised between 0.5 times and 8 times a characteristic dimension of a planar section of the tunnel junction; a composition and a thickness of the storage layer are chosen such that the absolute value of the derivative of the thermal stability factor compared to a characteristic dimension of a planar section of the tunnel junction is less than 10 nm⁻¹, the derivative of the thermal stability factor being calculated at a temperature T_(m), the temperature T_(m) being the average temperature of use of the magnetic tunnel junction.
 2. The magnetic random access memory point of SOT-MRAM type according to claim 1, wherein the metallic line includes a third electrical contact.
 3. The magnetic random access memory point of SOT-MRAM type according to claim 1, wherein its planar section is circular or quasi-circular and wherein said characteristic dimension is the diameter of the section.
 4. The magnetic random access memory point of SOT-MRAM type according to claim 3, wherein the diameter is less than 50 nm.
 5. The magnetic random access memory point of SOT-MRAM type according to claim 1, wherein the storage layer is constituted of a homogeneous magnetic material.
 6. The magnetic random access memory point of SOT-MRAM type according to claim 1, wherein the storage layer includes an assembly of magnetic and non-magnetic layers.
 7. The magnetic random access memory point of SOT-MRAM type according to claim 6, wherein the storage layer includes at least one magnetic layer containing an amorphising element and one or more layers able to absorb the amorphising element during post-deposition annealing.
 8. The magnetic random access memory point of SOT-MRAM type according to claim 6, wherein the storage layer includes at least two magnetic materials, of which a first material close to the tunnel barrier is able to provide a strong tunnel magnetoresistance and a second material has a low Gilbert dampening.
 9. The magnetic random access memory point of SOT-MRAM type according to claim 1, wherein: the tunnel barrier is made of MgO, AlOx, AlN, SrTiO₃, HfOx or any other insulating oxide or nitride; the storage layer comprises a stack of different layers including: a layer made of alloy of cobalt, iron and boron of thickness between 1 and 4 nm in contact with the tunnel barrier; a layer of a material, able to absorb boron such as Ta, Mo or W at the moment of post-deposition annealing, of 0.2 to 0.4 nm thickness, a magnetic layer with low Gilbert dampening.
 10. The magnetic random access memory point of SOT-MRAM type according to claim 1, wherein the storage layer is inserted between two tunnel barriers.
 11. The magnetic random access memory point of SOT-MRAM type according to claim 1, wherein: the storage layer has a thickness comprised between 0.8 and 8 times a characteristic dimension of a planar section of the tunnel junction; the contribution to the energy barrier due to the shape anisotropy of the storage layer is at least two times greater than the contributions to the energy barrier of interfacial origin.
 12. Method for manufacturing a magnetic tunnel junction with out-of-plane magnetisation including a storage layer having a magnetisation switchable between two magnetisation states normal to the plane of the layer, the two magnetisation states of the storage layer being separated by an energy barrier, said storage layer having a thickness comprised between 0.5 times and 8 times a characteristic dimension D of a planar section of the tunnel junction, said magnetic tunnel junction having a thermal stability factor Δ dependent on the energy barrier and on the average temperature of use of the magnetic tunnel junction T, said method comprising: calculating the optimal thickness L^(opti) of the storage layer using the formula: $L^{opti} = {\frac{1}{1 + \frac{3{cD}^{3}K_{D}}{2\; b\; \Delta}}{\quad\left\lbrack {\frac{5D}{4b} - \frac{3{cD}^{3}K_{K}}{4b\; \Delta} + \sqrt{\left( {\frac{5D}{4b} - \frac{3{cD}^{3}K_{K}}{4b\; \Delta}} \right)^{2} + {\frac{2D^{2}}{b^{2}}\left( {1 + \frac{3{cD}^{3}K_{D}}{2b\; \Delta}} \right)}}} \right\rbrack}}$ With ${b = \frac{4}{\sqrt{\pi}}},\mspace{14mu} {c = \frac{\pi}{4k_{B}T}},$ Ku the volume anisotropy of the storage layer, Ks the interfacial anisotropy of the storage layer and Kb Boltzmann's constant; calculating the optimal average magnetisation M_(S) ^(opti) of the storage layer using the formula: ${M_{S}^{opti} = \sqrt{\frac{16\; k_{B}T}{\pi \; \mu_{0}}\frac{2\; {\Delta \left( {D + {b\; L^{opti}}} \right)}^{2}}{3{b\left( L^{opti} \right)}^{2}D^{2}}}};$ choosing a material composing the storage layer having an average magnetisation sufficiently close to M_(S) ^(opti) and a total thickness sufficiently close to L^(opti) so that the absolute value of the derivative of the thermal stability factor compared to a characteristic dimension of a planar section of the tunnel junction is less than 10 nm⁻¹, the derivative of the thermal stability factor being calculated at a temperature T_(m), the temperature T_(m) being the average temperature of use of the magnetic tunnel junction. depositing all of the layers; etching the storage layer; etching the other layers.
 13. Method for manufacturing a magnetic tunnel junction with out-of-plane magnetisation according to claim 12, wherein the storage layer includes an interface layer made of FeCoB alloy and a volume layer of thickness L^(FM) and wherein method further includes: calculating the optimal thickness (L^(FM opti)) and the optimal magnetisation (M_(s) ^(FM opti)) of the volume layer using the formula: $\left\{ {\begin{matrix} {L^{F\; M\; {opti}} = {L^{opti} - L^{FeCoB}}} \\ {M_{S}^{F\; M\; {opti}} = \frac{{M_{S}^{opti}L^{opti}} - {M_{S}^{FeCoB}L^{FeCoB}}}{L^{opt}}} \end{matrix}\quad} \right.$ where L^(FeCoB) and M_(S) ^(FeCoB) are respectively the thickness and the magnetisation of the interface layer. choosing a material composing the volume layer of the storage layer having an average magnetisation sufficiently close to M_(S) ^(FM opti) and a thickness sufficiently close to L^(FM opti) so that the absolute value of the derivative of the thermal stability factor compared to a characteristic dimension of a planar section of the tunnel junction is less than 10 nm⁻¹, the derivative of the thermal stability factor being calculated at a temperature T_(m), the temperature T_(m) being the average temperature of use of the magnetic tunnel junction.
 14. The magnetic random access memory point of SOT-MRAM type according to claim 7, wherein the amorphising element is boron.
 15. The magnetic random access memory point of SOT-MRAM type according to claim 1, wherein the contribution to the energy barrier due to the shape anisotropy of the storage layer is at least four times greater than the contributions to the energy barrier of interfacial origin. 